Distribution properties of compressing sequences derived from primitive sequences modulo odd prime powers

Abstract

Let a and b be primitive sequences over Z/(pe) with odd prime p and e 2. For certain compressing maps, we consider the distribution properties of compressing sequences of a and b, and prove that a=b if the compressing sequences are equal at the times t such that α(t)=k, where α is a sequence related to a. We also discuss the s-uniform distribution property of compressing sequences. For some compressing maps, we have that there exist different primitive sequences such that the compressing sequences are s-uniform. We also discuss that compressing sequences can be s-uniform for how many elements s.